This Module is offered by TUM Department of Mathematics.
This module handbook serves to describe contents, learning outcome, methods and examination type as well as linking to current dates for courses and module examination in the respective
Module version of SS 2019 (current)
There are historic module descriptions of this module. A module description is valid until replaced by a newer one.
MA3001 is a semester module
in English language
at Master’s level
which is offered in winter semester.
This Module is included in the following catalogues within the study programs in physics.
- Catalogue of non-physics elective courses
|Total workload||Contact hours||Credits (ECTS)|
Banach and Hilbert spaces; bounded linear operators, open mapping theorem; spectral theory for compact selfadjoint operators; duality, Hahn-Banach theorems; weak and weak* convergence; brief introduction to unbounded operators
After successful completion of the module students are able to understand and apply basic theoretical techniques to analyze linear functionals and operators on Banach and Hilbert spaces. In particular, they can analyze spectra of compact selfadjoint operators, understand the notion of duality and can apply concepts of weak and weak-star convergence in Banach spaces.
MA1001 Analysis 1, MA1002 Analysis 2, MA1101 Linear Algebra and Discrete Structures 1, MA1102 Lineare Algebra and Discrete Structures 2
Bachelor 2019: MA0001 Analysis 1, MA0002 Analysis 2, MA0004 Linear Algebra 1, MA0005 Linear Algebra 2 and Discrete Structures
Courses and Schedule
Learning and Teaching Methods
The module is offered as lectures with accompanying practice sessions. In the lectures, the contents will be presented in a talk with demonstrative examples, as well as through discussion with the students. The lectures should motivate the students to carry out their own analysis of the themes presented and to independently study the relevant literature. Corresponding to each lecture, practice sessions will be offered, in which exercise sheets and solutions will be available. In this way, students can deepen their understanding of the methods and concepts taught in the lectures and independently check their progress. At the beginning of the module, the practice sessions will be offered under guidance, but during the term the sessions will become more independent, and intensify learning individually as well as in small groups.
W. Rudin, Functional Analysis, McGraw Hill, 1991.
M. Reed/B. Simon, Functional Analysis, Academic Press, 1972.
D. Werner: Funktionalanalysis, Springer, 2007.
F. Hirzebruch, W. Scharlau: Einführung in die Funktionalanalysis, BI-Hochschulbücher, 1991.
Description of exams and course work
The module examination is based on a written exam (90 minutes). Students have to know theoretical basics and methods to analyze linear functionals and operators in Banach and Hilbert spaces. They can give solutions to application problems in limited time.
The exam may be repeated at the end of the semester.